Fluid handling – Flow affected by fluid contact – energy field or coanda effect – Utilizing diverse fluids
Reexamination Certificate
1999-10-13
2001-10-02
Chambers, A. Michael (Department: 3753)
Fluid handling
Flow affected by fluid contact, energy field or coanda effect
Utilizing diverse fluids
C137S833000, C137S841000, C204S601000
Reexamination Certificate
active
06296020
ABSTRACT:
BACKGROUND OF THE INVENTION
The movement of fluids through channels on a micro scale has important implications in a number of technologies. For example, in the field of molecular biology, polymerase chain reactions (PCR) have been performed in a chip containing microfabricated flow channels (U.S. Pat. Nos. 5,498,392; 5,587,128; 5,726,026). In the electronics field, thermal ink jet printers use printheads with microchannels through which ink must flow in a well controlled manner (U.S. Pat. No. 5,119,116). Proper control of fluids through microchannels has been a challenge, with microdimensions imparting difficulties not encountered at larger scales.
The publications and other materials used herein to illuminate the background of the invention or provide additional details respecting the practice, are incorporated by reference, and for convenience are respectively grouped in the appended List of References.
Surface effects describe the character of a surface on a micro scale. Materials often have unbound electrons, exposed polar molecules, or other molecular level features that generate a surface charge or reactivity characteristic. Due to scaling these surface effects or surface forces are substantially more pronounced in micro structures than they are in traditionally sized devices. This is particularly true in micro scale fluid handling systems where the dynamics of fluid movement are governed by external pressures and by attractions between liquids and the materials they are flowing through. This fact can be utilized to fabricate unique structures that function due to these surface forces.
This invention deals with the passive control of fluids within a microfluidic circuit. The passive control is generated by using the natural forces that exist on a micro scale, specifically capillarity, which is caused by the attraction or repulsion of a fluid toward certain materials. The purpose is to stop fluid flow along one path in a circuit until enough pressure is generated to push the fluid past the stopping means, or until the stoppilng means itself is removed or made insignificant. The pressure that is generated because of the stopping means can be utilized to move fluid through the circuit in some creative manner, or to hold fluid at a specific location.
Capillarity is usually represented by the equation h=2&sgr;
gl
cos(&thgr;
c
)/gr&rgr; which describes the height (or depth), h, of a fluid within a capillary tube compared to the level of the fluid outside the capillary tube. &thgr;
c
, or the contact angle of the fluid with the capillary tube material, governs whether the fluid in the tube is above or below the level of the fluid outside the tube. If the contact angle of the capillary tube material, with respect to the fluid, is less than 90°, the material is considered hydrophilic (water liking). If the contact angle of the tube material, with respect to the fluid, is greater than 90°, the material is considered hydrophobic (water fearing). &sgr;
gl
represents the surface tension of the fluid with respect to the ambient (usually air) (millijoules/m
2
), g is the gravitational constant (m/s
2
), r is the radius of the capillary tube (m), and &rgr; is the fluid density (kg/m
3
).
FIGS. 1A-C
illustrate the concept of hydrophilicity and hydrophobicity.
FIG. 1A
illustrates &thgr;
c
. &sgr;
gs
is the surface tension between a gas and a solid, &sgr;
sl
is the surface tension between a solid and a liquid, and &sgr;
gl
is the surface tension between a gas and a liquid. &sgr;
gs
=&sgr;
sl
+&sgr;
gl
cos(&thgr;
c
). &thgr;
c
(angle in degrees) for water on various materials at around 20° C. is shown in Table 1.
FIG. 1B
illustrates that hydrophilic tubing, such as glass, draws water into the tube.
FIG. 1C
is similar to
FIG. 1B
but illustrates that the use of hydrophobic tubing (such as Teflon®) pushes water away from the tube.
TABLE 1
&thgr;
c
for Selected Materials
Material
&thgr;
c
Glass
0
Acetal
60
Polystyrene
84
HDPE (high density polyethylene)
87.1
PVDF (polyvinylidene fluoride)
94.8
PTFE (polytetrafluoroethylene)
104
FEP (fluorinated ethylenepropylene)
111
The term &rgr;gh, from the equation for capillarity, is sometimes referred to as the pressure head of a fluid, P (Pa). Re-writing the capillarity equation with respect to P gives P=2&sgr;
gl
cos(&thgr;
c
)/r. In order to effect a stopping means &sgr;
gl
, &thgr;
c
, r, or a combination of any of the three, needs to change from one side of the stopping means to the other. This will generate a pressure barrier, which causes the fluid to stop until the pressure barrier is overcome or removed. For example, if the radius of a channel were changed in order to effect a stopping means, the equation describing the pressure required to push past the stopping means would be given by &Dgr;P=2&sgr;
gl
cos(&thgr;
c
)(1/r
1
−1/r
2
), where r
1
is the radius of the channel before the stopping means and r
2
is the radius of the channel after the stopping means. This equation is a simplification of the physical system that may be present. A true model would take into consideration the actual channel geometries and other physical/chemical characteristics.
FIG. 1D
illustrates a change in channel radius. A channel of radius a changes abruptly to a channel of a smaller radius b. The channel of radius b again changes abruptly to the larger channel of radius a. If the material were hydrophilic the stopping means would be at the point where the channel radius increases in size. In this instance r
1
would be given by b and r
2
would be given by a. This would generate a positive value for &Dgr;P, because the cosine of anges between 0 and 90 degrees (the contact angle of the material) is positive. A positive &Dgr;P suggests a pressure barrier. If the material were hydrophobic the stopping means would be at the point where the channel decreases in size. In this case r
1
would be given by a, and r
2
by b. A negative cosine value, due to a contact angle greater than 90 degrees, would be multiplied by a negative (1/r
1
−1/r
2
) term, resulting in a positive &Dgr;P, or a pressure barrier.
If the contact angle of the material were to change, such as a hydrophilic channel having a hydrophobic region, this can also provide a stopping means. This situation would be characterized by the equation &Dgr;P=2&sgr;
gl
[cos(&thgr;
c1
)−cos(&thgr;
c2
)]/r, where &thgr;
c1
is the contact angle of the material before the stopping means (hydrophilic) and &thgr;
c2
is the contact angle of the material after the stopping means (hydrophobic). A negative cosine of &thgr;
c2
would result in a positive &Dgr;P, signifying a pressure barrier.
A change in surface tension of a fluid flowing through a microfluidic circuit, such as by lining the channel walls with absorbable salts or surfactants, could also generate a stopping means. The equation describing such a pressure barrier would be given by &Dgr;P=2 cos(&thgr;
c
)(&thgr;
c
)(&sgr;
gl1
−&sgr;
gl2
)/r, where &sgr;
gl1
is the surface tension of a fluid before the stopping means and &sgr;
gl2
is the surface tension of the fluid after the stopping means. In a hydrophobic material the surface tension would need to increase across the stopping means in order to create a pressure barrier.
This invention deals with the passive control of fluids through microfluidic channels using the stopping means described in the previous paragraphs. More specifically, the stopping means derived by reducing the radius, or cross-sectional flow area, of a flow channel containing aqueous based, or polar, fluids in a hydrophobic material, or a material coated with a hydrophobic film. Also encompassed is the control of nonpolar fluids within a hydrophilic material or a material that has been coated with a hydrophilic film. A short channel narrowing, or restriction, with these characteristics can act as a passive valve.
A variety of combinations of channel material and fluid combinations can be used to achieve the desired effect of controlling fluid f
McNeely Michael R.
Oliphant Arnold R
Spute Mark K.
BioMicro Systems, Inc.
Chambers A. Michael
Madson & Metcalf
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